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प्रश्न
In the adjoining figure circles with centres X and Y touch each other at point Z. A secant passing through Z intersects the circles at points A and B respectively. Prove that, radius XA || radius YB. Fill in the blanks and complete the proof.
Construction: Draw segments XZ and YZ.
Proof:
By theorem of touching circles, points X, Z, Y are `square`.
∴ ∠XZA ≅ `square` ...(Opposite angles)
Let ∠XZA = ∠BZY = a ...(i)
Now, seg XA ≅ seg XZ ...[Radii of the same circle]
∴ ∠XAZ = `square` = a ...[Isosceles triangle theorem] (ii)
Similarly, seg YB ≅ seg YZ ...[Radii of the same circle]
∴ ∠BZY = `square` = a ...[Isosceles triangle theorem] (iii)
∴ from (i), (ii), (iii),
∠XAZ = `square`
∴ radius XA || radius YZ ...[`square`]
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उत्तर
Construction: Draw segments XZ and YZ.
Proof:
By theorem of touching circles, points X, Z, Y are \[\boxed{\text{collinear}}\].
∴ ∠XZA ≅ \[\boxed{\text{∠BZY}}\] ...(Opposite angles)
Let ∠XZA = ∠BZY = a ...(i)
Now, seg XA ≅ seg XZ ...[Radii of the same circle]
∴∠XAZ = \[\boxed{\text{∠XZA}}\] = a ...[Isosceles triangle theorem] (ii)
Similarly, seg YB ≅ seg YZ ...[Radii of the same circle]
∴∠BZY = \[\boxed{\text{∠ZBY}}\] = a ...[Isosceles triangle theorem] (iii)
∴ from (i), (ii), (iii),
∠XAZ = \[\boxed{\text{∠ZBY}}\]
∴ radius XA || radius YB ...\[\boxed{\text{[Alternate angle test]}}\]
